How do you simplify (12m^-4p^2)/(-15m^3p^-9)12m4p215m3p9?

3 Answers
smendyka
Jul 18, 2017

See a solution process below:

Explanation:

First, rewrite the expression as:

(12/-15)(m^-4/m^3)(p^2/p^-9) => -(3 xx 4)/(3 xx 5)(m^-4/m^3)(p^2/p^-9) =>(1215)(m4m3)(p2p9)3×43×5(m4m3)(p2p9)

-(color(red)(cancel(color(black)(3))) xx 4)/(color(red)(cancel(color(black)(3))) xx 5)(m^-4/m^3)(p^2/p^-9) =>

-4/5(m^-4/m^3)(p^2/p^-9)

Next, use this rule for exponents to simplify the m terms:

x^color(red)(a)/x^color(blue)(b) = 1/x^(color(blue)(b)-color(red)(a))

-4/5(m^color(red)(-4)/m^color(blue)(3))(p^2/p^-9) => -4/5(1/m^(color(blue)(3)-color(red)(-4)))(p^2/p^-9) =>

-4/5(1/m^(color(blue)(3)+color(red)(4)))(p^2/p^-9) => -4/5(1/m^7)(p^2/p^-9) =>

-4/(5m^7)(p^2/p^-9)

Now, use this rule for exponents to simplify the p terms:

x^color(red)(a)/x^color(blue)(b) = x^(color(red)(a)-color(blue)(b))

-4/(5m^7)(p^color(red)(2)/p^color(blue)(-9)) => -4/(5m^7)p^(color(red)(2)-color(blue)(-9)) => -4/(5m^7)p^(color(red)(2)+color(blue)(9)) =>

-4/(5m^7)p^11 =>

-(4p^11)/(5m^7)

David Drayer
Jul 18, 2017

Factor and divide out common terms

Explanation:

12 m^-4p^2 = 3 xx 4 xx 1/m^4 xx p^2

15 m^3 p^-9 = 3xx 5 xx m^3 xx 1/p^9

Putting this a complex fraction gives

{ (3 xx 4 xx p^2)/(m^4)}/{(3 xx 5 xx m^3)/(p^9)

Multiplying both the top and the bottom by the inverse of the bottom gives

{ (3 xx 4 xx p^2) xx (p^9)} / {(m^4) xx( 3 xx 5 xx m^3)}

dividing out common terms and combining common terms gives

( 4 xx p^11)/( 5 xx m^7)

Barney V.
Jul 18, 2017

(4p^11)/(-5m^7)

Explanation:

(12m^-4p^2)/(-15m^3p^-9)

:.=(cancel12^4p^(2+9))/(cancel(-15)^-5m^(3+4))

:.=(4p^11)/(-5m^7)

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